Ugh....need Big Help!

Hi,

I need help with a word problem: One pipe can fill a hot tub in 9 minutes, while a second pipe can fill it in 15 minutes. If the tub is empty, how long will it take both pipes together to fill the hot tub?

I have several like this, so can you show me the formula so I can figure out how to plug the others in?

what?

Let's see... By the data of the problem, I suppose the pipes supply water at a constant rate. For the first pipe, call this rate . If the pipe supplies units of water in time t minutes, then we have , which integrates to the term being the initial supply at time . I guess , as we have to set the timer and open the tap simultaneously ( ). If the tub fills at units of water, then , and so . We conclude that, for the first pipe, the supply is .

Under the same suicidal considerations, we obtain that the supply of the second pipe is . For both pipes, the supply is (almost). When the tub fills, we will have , from where minutes...

So you have several questions like that. That is because that is a popular question.
And, I think there is a popular formula already developed for that type of question. I think it is
1/x +1/y = 1/t --------******
where
x = time the task can be done/finished alone by one performer.
y = another time the task can be done/finished alone also by another performer.
t = the time the task can be done/finished if the two performers perform together.

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We can derive that formula, why not.

Let J = complete task to be done.
and, performer A can finish it alone in x time.
and, performer B can finish it also alone in y time.
and, if A and B perform together, the J will be finished in t time.